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The growth of operator entropy in operator growth

Zhong-Ying Fan

2022Journal of High Energy Physics16 citationsDOIOpen Access PDF

Abstract

A bstract We study upper bounds on the growth of operator entropy S K in operator growth. Using uncertainty relation, we first prove a dispersion bound on the growth rate |∂ t S K | ≤ 2 b 1 ∆ S K , where b 1 is the first Lanczos coefficient and ∆ S K is the variance of S K . However, for irreversible process, this bound generally turns out to be too loose at long times. We further find a tighter bound in the long time limit using a universal logarithmic relation between Krylov complexity and operator entropy. The new bound describes the long time behavior of operator entropy very well for physically interesting cases, such as chaotic systems and integrable models.

Topics & Concepts

Operator (biology)PhysicsEntropy (arrow of time)Upper and lower boundsLogarithmMathematical physicsApplied mathematicsMathematicsMathematical analysisQuantum mechanicsGeneTranscription factorChemistryBiochemistryRepressorQuantum many-body systemsQuantum chaos and dynamical systemsAlgebraic structures and combinatorial models
The growth of operator entropy in operator growth | Litcius